A 2 Math Olympiad Study Packet - · PDF file1 radius A = πr2 WSMC Math Olympiad Study...

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1 radius A = πr 2 WSMC Math Olympiad Study Produced by PLU Math Department Students, 2008

Transcript of A 2 Math Olympiad Study Packet - · PDF file1 radius A = πr2 WSMC Math Olympiad Study...

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radius

A = πr2

WSMC

Math

Olympiad

Study

Packet

Produced by PLU Math Department Students, 2008

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Study Packet

Providing Useful Information for the Aspiring Mathlete and Coach.

This packet contains general equations, formulas and other useful information to provide a resource and a

refresher to coaches. Information covers all grades that participate in the Math Olympiad competition.

Coaches need to select the appropriate material for the grade level. It is not necessary to read through the

entire packet. It is best to think of this packet as a reference.

Contents

Multiplication Table

Order of Operations

Geometric equations

Vocabulary (Math Terms)

Conversion table for lengths, weight, volume

Probability

Percent Decimal Fraction Conversions

MULTIPLICATION TABLE

X 1 2 3 4 5 6 7 8 9 10 11 12

1 1 2 3 4 5 6 7 8 9 10 11 12

2 2 4 6 8 10 12 14 16 18 10 22 24

3 3 6 9 12 15 18 21 24 27 30 33 36

4 4 8 12 16 20 24 28 32 36 40 44 48

5 5 10 15 20 25 30 35 40 45 50 55 60

6 6 12 18 24 30 36 42 48 54 60 66 72

7 7 14 21 28 35 42 49 56 63 70 77 84

8 8 16 24 32 40 48 56 64 72 80 88 96

9 9 18 27 36 45 54 63 72 81 90 99 108

10 10 20 30 40 50 60 70 80 90 100 110 120

11 11 22 33 44 55 66 77 88 99 110 121 132

12 12 24 36 48 60 72 84 96 108 120 132 144

ORDER OF OPERATIONS:

When given any equation, certain operations should be done before the others, thus an order of

operations. The order should be done in the following sequence:

Parenthesis ( )

Exponents an

Multiplication or Division * ÷ (Priority from left to right)

Addition or Subtraction + – (Priority from left to right)

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As shown from top to bottom, those operations that fall into the parenthesis should be first worked

out, followed by those that have an exponent (or power). These are then followed by multiplication or

division, done as read from left to right, and then we finish off with any addition or subtraction problems,

also done from left to right.

We must take note that the operations of multiplication and division are considered “equal”

operations in the fact that they are doing the reverse of the other. This is also true for addition and

subtraction.

Here are a few examples to get a feel for the concept, going step by step:

Example Problem 1

Step 0: 16 – 10 ÷ 2 * 3 + 5 Since the division furthest to the left, we divide first

Step 1: 16 – 5 * 3 + 5 We then multiply due to Order of Operation

Step 2: 16 – 15 + 5 The subtraction sign is furthest to the left, so we divide first

Step 3: 1 + 5 All that is left to do is add

Step 4: 6

Example Problem 2

Step 0: 10 + 9 – 7 + (15 + 5 – 8 * 2) ÷ 2 Here we work inside the parenthesis first

The highest operation here is the

multiplication sign

Step 1: 10 + 9 – 7 + (15+ 5 – 16) ÷ 2 Still working inside the parenthesis, we’ll

add 15 to 5

Step 2: 10 + 9 – 7 + (20 – 16) ÷ 2 Still working inside the parenthesis, we’ll

Subtract 16 from 20

Step 3: 10 + 9 – 7 + 4 ÷ 2 We now dropped the parenthesis and can

divide 4 by 2

Step 4: 10 + 9 – 7 + 2 From here on we add and subtract from left

to right

Step 5: 19 – 7 + 2

Step 6: 12 + 2

Step 7: 14

Example Problem 3

Step 0: (3 * 2 * (15 * 2 ÷ 6)2 – 6) ÷ 12 – 10

This equation has two sets of parenthesis. In this case we work with

the inner most parentheses. Here we multiply 15 by 2 first

Step 1: (3 * 2 * (30 ÷ 6)2 – 6) ÷ 12 – 10

We then divide 30 by 6

Step 2: (3 * 2 * (5)2 – 6) ÷ 12 – 10

We can see here that outside these parentheses we have a power of 2.

Before we do anything else, let’s square this number.

Step 3: (3 * 2 * 25 – 6) ÷ 12 – 10

The parentheses finally drop and we can work on the next set of

parentheses. Starting from the left we multiply 3 by 2

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Step 4: (6 * 25 – 6) ÷ 12 – 10 We then multiply 6 by 25

Step 5: (150 – 6) ÷ 12 – 10 Lastly we subtract 6 from 150 and the last pair of

parentheses can drop

Step 6: 144 ÷ 12 – 10 Since division is done before subtraction, we divide

144 by 12

Step 7: 12– 10 And we finish the equation by subtracting 10 from

12

Step 8: 2

GEOMETRIC EQUATIONS:

For each equation we will have the equation written out in two ways as to be clear as possible. There will

also be abbreviations for each piece of measure as to make the equation easier to read. The abbreviations

are as follows:

Area = A

Base = b (when dealing with 2-Dimensional Figures)

Base = B (when dealing with 3-Dimensional Figures)

Height = h

Width = w

Circumference = C

Radius = r

Volume = V

Length = l

Any extra Abbreviations will be noted in the specific equation.

Height

Base

A= b * h

2 Base

Height

Area of a triangle: (base * height) ÷ 2

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---When dealing with volumes, the Base refers to the Area at the bottom 2-dimensional figure. We shall

denote Base here with B.

Base

Height

A= b * h

Area of a square or rectangle: base * height

Base

Height

radius

A = π * r2

radius

C= 2 * π * r

Area of a circle: π * radius * radius Circumference (perimeter): 2 π * radius

Base 1

Base 2

Height A= (b1 + b2) * h

2

Base 1 = l1

Base 2 = l2

Area of a Trapezoid: Height * (Base 1 + Base 2) ÷ 2

This can be thought up as the area of two triangles added together

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V = B * h

Volume of a Rectangular Prism: Base * height

Base here is the area of a rectangle

Height

V = B * h

Volume of a Triangular Prism: Base * height

Base here is the area of the triangle

Height

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radius

Height

V = B * h

Volume of a Cylinder (Circular Prism): Base * height

The Base is the area of a circle

Volume of a Cone: (Base * Height) ÷ 3

Similar to the Cylinders, the Base here is taken from the 2-dimensional shape.

In this case the Base is the area of a circle.

radius

V= B * h

3

Height

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VOCABULARY:

Absolute value - The absolute value of a number is the positive value of that number. For a positive

number, it is just the number. For a negative number it is its positive value. So, the absolute value of 5

is 5, and the absolute value of -5 is 5 also. Absolute value is written | - 5 | = 5 with vertical bars around

the number. You can think of absolute value as the distance from zero to your number.

Acute - An acute angle is less than 90 degrees.

Height

V= B * h

3

Volume of a Pyramid: (Base * Height) ÷ 3

Similar to the Cylinders, the Base here is taken from the 2-dimensional shape.

In this case the Base is the area of a Square.

Volume of a Sphere: (4 * π * radius * radius * radius) ÷ 3

V= 4 * π * r3

3

radius

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Adjacent - Adjacent means "next to each other". Adjacent sides of a polygon are the sides that are next to

each other.

Angle - An angle is formed when 2 lines meet or cross each other:

Angles are measured in degrees. The angle shown above is approximately 40 degrees.

A right angle: is 90 degrees.

Area - The area of a flat, or plane figure is the number of unit squares that can be contained within it. The

unit square is usually some standard unit, like a square meter, a square foot, or a square inch. So, if

you are trying to find the area of a sheet of paper that is 9 inches by 11 inches, and the unit square you

want is the square inch, then there are 9 * 11 = 99 square inches in that sheet of paper.

Arithmetic sequence - An arithmetic sequence is one in which the same number is added or subtracted

from each element to get the next element in the sequence.

2, 4, 6, 8, 10, ... is an arithmetic sequence.

Circumference - The circumference of a circle is the distance around the circle. It is the circle's perimeter.

The formula for circumference is:

C = d

where d is the circle's diameter and is 3.14 (approximately).

Complementary angles - Two angles are said to be complementary if their sum is 90o. This makes them

add up to a right angle. In a right triangle, the 2 angles other than the right angle are complementary

because they add up to 90 degrees. (All the angles of a triangle add up to 180o).

Concentric - Concentric means having the same center. Two circles which have the same center are

concentric:

Congruent - Two figures are congruent if they are the same size and shape. They can be mirror images of

each other, or turned in any direction relative to each other.

Consecutive - Consecutive means "one after another", or "in a row". So ...

The first 4 consecutive numbers are 1,2,3, and 4.

The first 4 consecutive odd numbers are 1,3,5, and 7.

Cylinder - A cylinder is a solid with circular ends and straight sides. A pipe is considered a cylinder. The

formula for the volume of a cylinder is:

V = L * * r2

where “r” is the radius of the end of the cylinder and L is it's length or height.

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Decimal -A decimal number is a number with a decimal point in it, like these:

1.5 .6 3.14

The number to the left of the decimal is an ordinary whole number. The first number to the right of the

decimal is the number of tenths (1/10's). The second is the number of hundredths (1/100's) and so on.

So, for the number 1.5, this is a shorthand way of writing the mixed number 1 5/10.

3.14 is a shorthand way of writing 3 + 1/10 + 4/100.

Diagonal - A straight line connecting two corners (or vertices) of a polygon that are not next to each

other.

Diameter - The diameter of a circle is the distance across the circle, through its center. It is the circle's

width and is usually represented by the letter d. It is twice the circle's radius.

Digit - A digit is a single whole number (0 to 9) in a number 10 or larger. For example, the number 432

has 3 digits. Each digit has a place value. In the number 432, the 2 is the number of ones in the

number.

The 3 is the number of 10's in the number, and the 4 is the number of 100's in the number. So you can

add them up, like this:

4 * 100 = 400

3 * 10 = 30

2 * 1 = 2

---

432

Discount - A discount is a percentage that is subtracted from a number. For example, a 10% discount of

$30 is $3 (10% converted to a decimal is .10 and .10 * 30 is 3). So an item that sells for $30 and is

being offered at a 10% discount can be bought for $27. ($30 - $3).

Distributive property - The distributive property of algebra is about grouping terms. It states that for any

real numbers a, b, and c, that:

ac + bc = (a + b)c or ...

ac - bc = (a - b)c

So, using a = 4 and b = 5:

4c + 5c = (4 + 5)c = (4 + 5)c or ...

4c - &nbsp5c = (4 - &nbsp5)c = - c

The opposite is also true:

(a + b)c = ac + bc

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Basically what this property means is that if two or more terms involve the same variable (say "c"),

and they are either added or subtracted, then you can group the other terms together inside parentheses

and multiply the whole term in the parentheses times c. This often lets you simplify an expression by

combining the terms inside the parentheses.

Denominator - The denominator is the bottom part of a fraction. For example, in the fraction 3/4, the

denominator is 4.

The number on the top is called the numerator. The denominator is the number of parts that you cut

something into. For example, if you cut a pizza into 4 pieces (the denominator), and you get 3 pieces

(the numerator), then you got 3/4 of the pizza.

Equation - An equation is a math sentence that says that 2 things are equal. An equation always has an

equal (=) sign. The thing or things that are on the left side of the equal sign are equal to the things on

the right side of the equal sign. Here are a few equations:

X = Y + 5

A = B - 4

Z = 3 A

C = D (circumference of a circle)

A = W H (area of a rectangle with width W and height H)

E = M C2 (Einstein's famous equation)

In the first equation, if Y is 2, then X must be 2 + 5 or 7 to make the equation true. In the second

equation, if B is 10, then A must be 6 to make the equation true. In the third equation, the number next

to the letter means multiply the value of the variable represented by "A" by 3. So if A is 4, then Z must

be 12 to make the third equation true.

Equilateral triangle - An equilateral triangle is one that has all 3 sides the same length: All the angles of

the triangle are the same too. They are all 60 degrees.

Exponent - An exponent is a small number written with another big number that tells how many times to

multiply the big number by itself. It looks like this:

32

and this means 3 * 3 that equals 9.

The little 2 is the exponent

It DOES NOT mean to multiply the 3 by 2. It means to multiply the 3 times itself. Here's another one:

43 = 4 * 4 * 4 = 64.

The little 3 tells how many 4's to multiply together.

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Expression - An algebraic expression is a mathematical phrase that can contain ordinary numbers,

variables (like x or y) and operators (like add, subtract, multiply, and divide).

Here are some algebraic expressions:

a + 1

a - b

3x

x - a / b

In the above expression the "/" means divide. The "3x" means multiply the variable x by 3.

Many English phrases translate directly into algebraic expressions, as shown in the following table

(where x stands for "a number"):

English expression Algebraic expression

A number plus eight x + 8

four less than a number x - 4

half of a number x / 2

If you set an algebraic expression equal to something, with an equal sign, you now have an equation,

like: x - 4 = 10

Factor -To factor a number means to break it up into numbers that can be multiplied together to get the

original number.

EXAMPLES:

6 = 3 * 2 so, factors of 6 are 3 and 2

9 = 3 * 3 so, factors of 9 are 3 and 3

Sometimes, numbers can be factored into different combinations. For example,

8 = 4 * 2 = 2 * 2 * 2

18 = 9 * 2 = 6 * 3 = 3 * 2 * 3

Factorial -A number factorial means to multiply that number by all the whole numbers below it. It is

written with a exclamation (!) mark after it, like this: 5!, and means:

5! = 5 * 4 * 3 * 2 * 1 = 120

6! = 6 * 5 * 4 * 3 * 2 * 1 = 720

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Fraction - A fraction is a number between zero and 1 and is expressed as one number over another

number, like this:

The number on top is called the numerator and the number on the bottom is called the denominator. It

means that if you cut up a whole into 2 parts (the denominator), then the fraction is 1 of those 2 parts,

or a half. When you think of a fraction, think of a pizza!. Suppose a pizza is cut evenly into 8 pieces.

These 8 pieces are the denominator. Now, if you ate 3 of them you ate 3/8 of the pizza. This is not

quite half of the pizza. Half of the pizza would be how many pieces? That's right, it would be 4 pieces.

This makes the fraction 4/8 which can be reduced to 1/2 or 'half' of the pizza. A fraction can be

converted into a decimal or a percent.

Geometric sequence - A geometric sequence is one in which the same number is multiplied or divided by

each element to get the next element in the sequence. 2, 4, 8, 16 ... is a geometric sequence.

Greatest common fact or (GCF) - The greatest common factor between 2 numbers is the largest factor

that they have in common. One good way to find this number is to write down all the factors of both

numbers and then find the biggest one that appears in both lists.

For example, find the GCF of 12 and 8:

Factors of 12: 1 , 2 , 3 , 4 , 6 , 12

Factors of 8 : 1 , 2 , 4 , 8

The largest factor they both have is 4. This is the greatest common factor (GCF).

Hemisphere - A hemisphere is half of a sphere (ball). When you cut a grapefruit in half, you have a

hemisphere.

Hexagon - A hexagon is a 6-sided figure, or polygon.

A bee's honeycomb is made of little hexagons.

Horizontal - Horizontal means lying down or flat, like a floor. This is the opposite of vertical. A

horizontal line and a vertical line are perpendicular.

Hypotenuse - The hypotenuse of a right triangle is the longest side of the right triangle.

It is the side opposite the right angle. To learn more about types of triangles see the triangle notes.

Improper fraction - An improper fraction is a fraction that has a numerator larger than it's denominator.

Here are a few improper fractions:

3/2 4/3 5/2 12/5 9/5

You can convert an improper fraction to a mixed number by dividing the numerator by the

denominator and leaving the remainder over the denominator as a fraction. So the improper fractions

above would become the following mixed numbers:

1 1/2 1 1/3 2 1/2 2 2/5 1 4/5

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Inequality - An inequality is like an equation that uses symbols for "less than"(<) and "greater than"(>)

where an equation uses a symbol for "is equal to" (=).

So where the equation:

X = Y + 5

says that "X is equal to Y plus 5",

X < Y + 5

says that "X is less than Y plus 5", and

X > Y + 5

says that "X is greater than Y plus 5".

Integer - An integer is a positive whole number (like 1, 2, 3 .. ),

a negative whole number (like -1, -2, -3 ... ),

or zero.

It is not a decimal number, or a fraction.

This number line consists of only integers:

...---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|...

-7 -6 -5 -4 -3 -2 -1 0 +1 +2 +3 +4 +5 +6 +7 +8

Intersection -When 2 lines cross, they form an intersection:

Intersection of two sets - The intersection of two sets are all the elements that appear in both sets. For

example, if you have the two sets of numbers: {3,4,5,6,7}, and {5,6,7,8,9,10}, the intersection of these

sets is:{5,6,7}. The symbol for intersection is an upside-down capital U, so if we call our first set "A"

and our second set "B" then the set {5,6,7} is .

Isosceles triangle - An isosceles triangle is a triangle that has 2 sides and 2 angles the same length. Two

of the angles are the same measure also. The triangle to the right is isosceles. For example, if you have

a triangle that is isosceles and has one angle that is 100 degrees, what are the other 2 angles?

Well, the other 2 angles sum to 80 degrees (180 - 100), and both of the other 2 angles are the same, so

the sum of the other 2 identical angles is 80 degrees, so each of the other angles must be 40 degrees!

Inscribed figure - An inscribed figure is one that is drawn inside another, usually with the edges

touching. For example if you drew a triangle inside a square, the triangle is inscribed in the square.

Least common multiple (LCM) - The least common multiple (LCM) of 2 numbers is the smallest

number that they both divide evenly into. One good way to find the least common multiple of 2

numbers is to multiply both numbers by 1,2,3,4,5... and then find the first multiple that appears in both

lists.

For example, find the least common multiple of 6 and 8:

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Multiples of 6: 6 12 18 24 30 36 42 48 54 60

Multiples of 8: 8 16 24 32 40 48 56 64 72 80

The first number that appears in both lists is 24. (48 appears also, but it is not 'least'), so 24 is the LCM of

6 and 8.

Maximum - The maximum of a set of numbers is the largest one. The maximum of the set {3,2,8,1,9,4,2}

is 9.

Mean - The mean of a set of numbers is their average. You find the average of a set of numbers by adding

them up and dividing by the number of numbers you have. So, the mean of 3,4,6,9, and 3 is:

3 + 4 + 6 + 9 + 3 25

----------------- = -- = 5

5 5

Median - The median of a set of numbers is the number in the middle. For example, in the set of numbers

{4,6,25}, the median is 6. However the numbers must be in order for the median to be in the middle. If

there are an even number of numbers, then the median is the average of the last 2 middle numbers.

There are 2 ways to find the median of a set of numbers:

1. Rewrite the numbers in order, then find the one in the middle

2. Cross off the highest number, then the lowest, then the highest, lowest, on and on, until only

one number is left. That number will be the median.

This second method works best when you have a large number of numbers.

Minimum - The minimum of a set of numbers is the smallest one. The minimum of {3,2,8,1,9,2} is 1.

Mixed number - A mixed number is a whole number plus a fraction. Here are a few mixed numbers: 1 1/2 1 1/3 2 1/2 2 2/5 1 4/5

You can convert a mixed number to an improper fraction by finding the number of unit fractions in the

whole number and then adding the fractional part of the whole number. This sounds hard, but it really

isn't. For example, in the first example the 1 changes to 2/2 because there are 2 halves in a whole. In

the fourth example, the 2 becomes 10/5 because there are 5 fifths in a whole. Get it? Once you have

done this, then you just add the fraction to it. So, each of our examples above becomes: 3/2 4/3 5/2 12/5 9/5

Mode - The mode of a set of numbers is the one that occurs most often. So, in the set {1,5,7,5,9}, the

mode is 5 because there are 2 fives and only one of each of the others.

Negative number - A negative number is a number below zero. It can be an integer or a decimal and is

written with a minus sign (-) in front of it, like this: -3

You can get an idea of what a negative number is with a number line, like this one:

---|---|---|---|---|---|---|---|---|---|---|---|---|---|- ...

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-7 -6 -5 -4 -3 -2 -1 0 1 2 3 4 5 6

You can see from this number line that you can continue counting down when you get to zero.

Negative numbers represent things like very cold temperatures, and overdrawn bank balances!

Numerator - The numerator is the top part of a fraction. For example, in the fraction 3/4, the numerator is

3.

The number on the bottom is called the denominator. This is the number of parts out of the total

number of parts that your fraction has. For example, if you cut a pizza into 4 pieces, and you get 3 (the

numerator), then you got 3/4 of the pizza.

Obtuse angle - An obtuse angle is an angle greater than 90 degrees:

Octagon - An octagon is an 8-sided figure:

A stop sign is an octagon:

Odds - Odds are a way of expressing a probability as the ratio of the number of things that you are not

looking for to the number of things that you are looking for. So the odds against flipping a coin and it

coming up heads are 1:1 = 1(even odds), because there are 2 sides of the coin and you are looking for

only one of them.

Palindrome - A palindrome is a number that reads the same from left to right and from right to left. 101 is

the smallest 3-digit palindrome. 123454321 is a palindrome.

Parallel - Two lines in a plane are parallel if they never cross:

The opposite sides of a square are parallel.

Parallelogram -A parallelogram is a 4-sided figure in which the opposite sides are parallel. A diamond

shape is a parallelogram. Squares and rectangles are special kinds of parallelogram.

Parallelepiped - A parallelepiped is a solid (3-dimensional) figure in which all faces are parallelograms.

A special kind of parallelepiped is a rectangular box, like a shoe box. It is a solid figure and has a

volume.

Pentagon - A pentagon is a 5-sided figure:

The United States Military Headquarters building is a pentagon.

Percent - A percent is the number of parts out of 100 of something. For example, a quarter (25 cents) is

25 percent of a dollar (100 cents). It is the numerator of a fraction whose denominator is 100. So, the

fraction 25/100 is 25 percent, sometimes written as 25%. If you have a decimal number, like .72 and

you want to convert it to a percent, you just multiply it by 100. So the decimal .72 becomes (100 * .72)

= 72 percent.

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Perfect square - A perfect square is a number that has a whole number square root. For example, 25 is a

perfect square, because is 5, a whole number.

Perimeter - The perimeter of a figure is the total distance around the edge of the figure. For example, a

square whose sides are 6 inches long has a perimeter of 6 * 4 = 24 inches because it has 4 sides 6

inches long. A rectangle whose length and width are 4 meters and 3 meters has a perimeter of 4 + 4 +

3 + 3 = 14 meters.

Permutation - A permutation is a way to order a set of things. For example, if your set is the letters in the

word WHO, then one other ordering would be WOH. Here are all the possible orderings of the letters

in the word WHO:

WHO WOH HWO HOW OWH OHW

Perpendicular - Two lines or planes are perpendicular to each other if the angle between them is 90

degrees, or a right angle.

- (pronounced "pie") is the ratio of a circle's circumference (C) to its

diameter (D), or:

= C / D

Where C is the circumference and D is the diameter. It is a

decimal that goes on forever, and is approximately:

3.141592653589793..., but we usually just use 3.14

Plane - A plane is a flat surface, like a piece of paper or a table top.

Polygon - A polygon is a flat, or plane closed figure made up of at

least 3 lines. Triangles, rectangles, octagons, and all other flat figures that have 3 or more sides are

polygons.

Prime number - A prime number is a number, larger than 1, that can only be divided evenly by itself and

1. The first 4 prime numbers are 2,3,5 and 7. 4 is not a prime because it can be divided by 2.

Prime factorization - Prime factorization is finding the factors of a number that are all prime. Here's how

you do it: Find 2 factors of your number. Then look at your 2 factors and determine if one or both of

them is not prime. If it is not a prime factor it. Repeat this process until all your factors are prime.

Here's an example:

Find the prime factors of the number 84:

84

/ \

42 x 2 (84 is 42 times 2)

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/ \

21 x 2 (42 is 21 times 2)

/ \

7 x 3 (21 is 7 times 3)

(7 and 3 are both prime, so we stop!)

So the prime factors of 84 are 7 * 3 * 2 * 2.

Probability - Probability is the likelihood of something happening in the future. It is expressed as a

number between zero (can never happen) to 1 (will always happen). It can be expressed as a fraction, a

decimal, a percent, or as "odds".

Pyramid - A pyramid is a 3-dimensional (solid) figure that has a polygon for a base and has a single

vertex that is not in the plane of the polygon base. The Egyptian pyramids have square bases and

triangular sides, meeting at the top, the vertex.

Pythagorean Theorem - The Pythagorean Theorem states that, in a right triangle, if you call the

hypotenuse c and the other 2 sides a and b, then:

c2 = a2 + b2

For example, in a right triangle that has side a = 3 inches and side b = 4 inches, then the hypotenuse

(side c) =:

c2 = 32 + 42 =

c2 = 9 + 16 = 25. So c is the, which is 5.

Quadrilateral - A quadrilateral is a 4-sided figure:

It can be any shape, as long as it has four sides. A square is a quadrilateral.

Quotient - A quotient is the result of dividing one number by another. For example, the quotient of 8 and

4 is 8/4 = 2.

Radical - A radical is a square root sign and looks like this:. Most calculators have a on one of the keys.

(See Square Root)

Radius - The radius of a circle is the distance from its center to its edge:

It is half of the circle's diameter

Range - The range of a set of numbers is the highest number minus the lowest number. So, in the set {

2,5,8,2,1,4,3] the highest number is 8 and the lowest number is 1, so the range is

8 - 1 = 7 (range)

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If there are any negative numbers in the set, then you have to be really careful, because subtracting a

negative number is the same thing as adding the positive number. So, in the set

5 -1 6 -2 0

The highest number is 6 and the lowest number is - 2, so the range is:

6 - (-2) = 6 + 2 = 8

Think of it as the distance between 6 and - 2 on the number line, like this:

---|---|---|---|---|---|---|---|---|---|---|---|-- ...

-3 -2 -1 0 1 2 3 4 5 6 7 8 ...

|<------------ 8 -------------->|

Ratio - The ratio of 2 numbers is the first number divided by the second number. For example, the ratio of

8 to 4 is 2.

Reciprocal - The reciprocal of a fraction is the fraction turned upside-down. For example the reciprocal

of 2/3 is 3/2, or as a mixed number:

1 1/2

Rectangular prism - A rectangular prism is a solid figure where all sides are rectangles and all sides meet

perpendicular. A brick or a shoebox is a rectangular prism.

Reducing fractions - To reduce a fraction means to remove a common factor that the numerator and the

denominator both have. This means that you have to factor both the numerator and denominator and

then cancel any factors that appear in both the numerator and denominator. Multiply the numbers in

the numerator together to get the new numerator. Multiply the numbers in the denominator together to

get the new denominator. Here's an example:

Remove the 3's and you get 2/3

Here's another example:

Remove the 7's and you get 3/4

Right angle - A right angle is a 90 degree angle. This is the angle 2 things make when they meet 'square',

like the floor with the wall, or a table leg with a floor. The symbol for a right angle is a little square

like this:

Right triangle - A right triangle is a triangle that has one 90 degree angle: A 90 degree angle is called a

right angle.

Set - A set is a collection of related things. When a set is listed, it's members are usually listed between

curly brackets, like these: { }

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Here are a few sets:

1. Members of a class whose names start with L: {Lacie, Luke, Lauren}

2. Days of the week:

{Sunday, Monday, Tuesday, Wednesday, Thursday, Friday, Saturday}

3. Colors of the rainbow: {red, orange, yellow, green, blue, indigo, violet}

4. Whole numbers between 3 and 10: {4, 5, 6, 7, 8, 9}

5. Daily high temperatures in the first week of February: {53, 48, 49, 55, 44, 51, 54}

Sphere - A sphere is a round ball, like a basketball or a baseball or a planet: It is a solid figure where all

points on its surface are the same distance from the center of the figure.

Square - A square is a quadrilateral figure that has all sides equal, opposite sides that are parallel and

adjacent sides perpendicular to each other. Here is a square with sides 5 inches long:

Square root - The square root of a number is a number which multiplied by itself, gives you the original

number. Its symbol is called a radical and looks like this:. For example, is 3, because 3 * 3 = 9. Here

are a few other square roots:

The is 4 because 4 * 4 is 16

The is 5 because 5 * 5 is 25

Supplementary angles - Two angles are said to be supplementary if their sum is 180o. This makes them

add up to make a straight line. If you take a ruler and bring one end down on a table top, the two

angles that the tabletop makes with the ruler (one angle on each side of the ruler) are supplementary

angles.

Trapezoid - A trapezoid is a quadrilateral with at least 2 opposite sides parallel:

If you cut off the top of a triangle parallel with its base, you will have a trapezoid. A square is a special

type of trapezoid.

Union of two sets - The union of two sets is everything in both sets. For example if you have the set

{3,4,5} and the set {5,6,7}, then the union of these two sets is {3,4,5,6,7}. The symbol for union is a

capital U. So mathematically, the above sentence would read:

U {3,4,5} {5,6,7} = {3,4,5,6,7}

Vertex - A vertex of a figure is a corner. The plural of vertex is vertices. For example, a triangle has 3

vertices.

Vertical - Upright, or standing up, like a telephone pole. This is the opposite of horizontal. A vertical line

and a horizontal line are perpendicular

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Volume- Volume is the measure of the amount of space inside of a solid figure, like a cube, ball, cylinder

or pyramid. It's units are always "cubic", that is, the number of little element cubes that fit inside the

figure.

The formula for the volume of a rectangular prism is:

Area = l * w * h where: l = length, w = width, h = height

CONVERSION TABLE

Symbol When You

Know

Multiply By To Find Symbol

LENGTH

in. inches 2.54 centimeters cm

ft. feet 30 centimeters cm

yd. yards 0.9 meters m

mi. miles 1.6 ki1ometers km

mm millimeters 0,04 inches in

cm centimeters 0.4 inches in

m meters 3.3 feet ft

m meters 1.1 yards yd

km kilometers 0.6 miles mi.

Symbol When You

Know

Multiply By To Find Symbol

AREA

in2 square inches 6.5 sq. centimeter cm2

ft2 square feet 0.09 square meters m2

yd2 square yards 0.8 square meters m2

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mi2 square miles 2.b sq. kilometers km2

cm2 sq. centimeters 0.16 square inches in2

m2 square meters 1.2 square yards yd2

km2 sq. kilometers 0.4 square miles mi2

Symbol When You

Know

Multiply By To Find Symbol

VOLUME

ft3 cubic feet .028 cubic meters m3

yd3 cubic yards 0.76 cubic meters m3

m3 cubic meters 35 cubic feet ft3

m3 cubic meters 1.3 cubic yards yd3

Probability

What is probability? In order to understand probability, you must know how many possible ways something can

happen. If I flip a coin, how may ways can it land? There are two possible ways. If we want to calculate

the probability of the coin landing a head, we see that the head is one of two possible ways so the

probability is 1/2 or .5.

Now, how many ways can a single die land? This is 6 because there are six faces of a die. What is

the probability of rolling a 3 with a single die? 1/6 because there is one "3" and 6 possibilities.

What is the probability of rolling an even number with a single die? 3/6 or 1/2 because there are 3

even numbers [2,4,6], and 6 possibilities.

If you throw 5 heads in a row, what is the probability of throwing a head on the next flip? Well, the

6th flip is not at all dependent on the previous throws, so the probability is still 1/2. This is a different

question from asking what is the probability of throwing 6 heads in a row. We will answer that in a

minute.

Values of probability Probability is expressed as a fraction: the denominator is the total number of ways things can

occur and the numerator is the number of things that you are hoping will occur. Probability is

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always a number between 0 and 1 or between 0% and 100%. 0 means something cannot happen

(impossible) and 1 (or 100%) means it is sure to happen.

Single events Flipping coins and throwing a single die are examples of single events. Now for harder single

events: How many cards are in a standard deck of playing cards? [52]. So, what is the probability

of drawing:

o One particular card (say, the 3 of spades)? [1/52]

o Any card in a particular suit (say, diamonds)? [13/52 or 1/4]

o Any card of a particular rank (say, a king)? [4/52 or 1/13]

o A red or a black card? [52/52 or 1, because all cards are either red or black]

Two or more things happening Frequently we want to know the probability of 2 things happening, in other words, one thing

happens AND then another thing happens. (AND means multiply). You multiply the probability of

one thing happening by the probability of the other thing happening. What is the probability of:

o Flipping 2 heads in a row? [1/2 * 1/2 = 1/4]

o Flipping 6 heads in a row? [1/2 * 1/2 * 1/2 * 1/2 * 1/2 * 1/2 = 1/64] (pretty small!)

o Throwing 2 sixes on a die? [1/6 * 1/6 = 1/36]

(Rolling one die twice is the same as rolling 2 dice together once)

o Throwing an 11 using 2 dice? [2/36 because there are 2 ways of throwing an 11: 5 + 6 and

6 + 5]

o Drawing 2 aces? It depends on if you put the 1st one back before drawing the 2nd.

If you did put it back, then it is 4/52 * 4/52 = 16/2704 = 1/169.

If you didn't put it back, then it is 4/52 * 3/51 = 12/2652 = 1/221. The second probability is

3/51 because there are only 3 aces left and 51 cards left after you successfully take out the

first ace. You have a better chance of getting 2 aces if you put the first one back before

drawing again.

Something does not happen: Well, if a sure thing has a probability of 1, then the probability that something does not happen is 1

minus the probability that it does happen. What is the probability that you will NOT throw a 1 using

one die? [1 - 1/6 = 5/6]

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THE SUM OF

TWO DICE

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PERCENT FRACTION AND DECIMAL CONVERSIONS

... to a fraction ... to a decimal ... to a percent

From a

fraction

...

Divide the

numerator of the

fraction by the

denominator

Ex 3/4: divide 3 by

4 to get .75

Convert to a

decimal, then

multiply by 100

Ex: 3/4 is the

decimal .75

.75 * 100 = 75%

From a

decimal

...

If the decimal

has 1 number

past the decimal

===>

Multiply by 10 to get

the numerator and make

the denominator 10

Ex: .7 * 10 = 7

Fraction is 7/10

If the decimal

has 2 numbers

past the decimal

===>

Multiply by 100 to get

the numerator and make

the denominator 100

Ex: .72 * 100 = 72

Fraction is 72/100

If the decimal

has 3 numbers

past the decimal

===>

Multiply by 1000 to get

the numerator and make

the denominator 1000

Ex: .725 * 1000 = 725

Fraction is 725/1000

Multiply the

decimal by 100

Example: .38 * 100

= 38%

From a

percent

...

Make a fraction by making the percent the

numerator

with a denominator of 100

Example: 38% = 38/100

Divide the percent

by 100

Example: 38%:

divide 38 by 100 to

get .38

PROPORTIONS AND RATIO

Ratio

A ratio is a comparison of two numbers. We generally separate the two numbers in the ratio with a colon

(:). Suppose we want to write the ratio of 8 and 12.

We can write this as 8:12 or as a fraction 8/12, and we say the ratio is eight to twelve.

Examples:

Jeannine has a bag with 3 videocassettes, 4 marbles, 7 books, and 1 orange.

1) What is the ratio of books to marbles?

Expressed as a fraction, with the numerator equal to the first quantity and the denominator equal to the

second, the answer would be 7/4.

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Two other ways of writing the ratio are 7 to 4, and 7:4.

2) What is the ratio of videocassettes to the total number of items in the bag?

There are 3 videocassettes, and 3 + 4 + 7 + 1 = 15 items total.

The answer can be expressed as 3/15, 3 to 15, or 3:15.

Another every day example would be baking cookies. If a recipe calls for about 2 eggs, and 1 bag of

chocolate chips to make 2 dozen cookies (24 cookies), then we would need 4 eggs and 2 bags of chocolate

chips to make 48 cookies. So the ratio for eggs and bags of chocolate chips are

2:1 which is equal to 4:2

Comparing Ratios

To compare ratios, write them as fractions. The ratios are equal if they are equal when written as fractions.

Example:

Are the ratios 3 to 4 and 6:8 equal?

The ratios are equal if 3/4 = 6/8.

These are equal if their cross products are equal; that is, if 3 * 8 = 4 * 6. Since both of these products equal

24, the answer is yes, the ratios are equal.

Remember to be careful! Order matters!

A ratio of 1:7 is not the same as a ratio of 7:1.

Examples:

Are the ratios 7:1 and 4:81 equal? No!

7/1 > 1, but 4/81 < 1, so the ratios can't be equal.

Are 7:14 and 36:72 equal?

Notice that 7/14 and 36/72 are both equal to 1/2, so the two ratios are equal.

From the cookies example we had, our 2 eggs and 1 bag of chocolate chips has a ratio of 2 to 1, or 2:1.

that ratio is the same as 4 to 2 or 4:2. our ratio’s are equal.

Proportion

A proportion is an equation with a ratio on each side. It is a statement that two ratios are equal. 3/4 = 6/8

is an example of a proportion.

When one of the four numbers in a proportion is unknown, cross products may be used to find the

unknown number. This is called solving the proportion. Question marks or letters are frequently used in

place of the unknown number.

Example:

Solve for n: 1/2 = n/4.

Using cross products we see that 2 * n = 1 * 4 =4, so 2 * n = 4. Dividing both sides by 2, n = 4 ÷ 2 so that

n = 2.

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Some Resources http://www.wsmc.net/math-olympiad/previous-years-materials/

http://home.avvanta.com/~math/practices.html

http://home.avvanta.com/~math/

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? SUGGESTIONS ?

In order to improve on this packet and to provide you, the parents, and the students with a better

resource we ask that you provide any comments or suggestions. We would like to know what worked

well, what was unneeded or complicated, and what you would like to see next time or may need now.

You may use this page for your comments and send it back to school with your child for the teachers and

the math coaches to read.